How do you find the coordinates of the points on

Harken43

Harken43

Answered question

2022-02-15

How do you find the coordinates of the points on the curve x2xy+y2=9 where the tangent line is vertical?

Answer & Explanation

Balraj Conrad

Balraj Conrad

Beginner2022-02-16Added 9 answers

Explanation:
Find dydx using implicit differentiation.
dydx=y2xx2y
The tangent will be vertical when dydx approaches , which happens at y=12x
Now substitute 12x for y in the original equation and solve to get x=±23.
Finish by using y=12x to get the y coordinates.
So the points are (23,3)and(23,3)
Asa Buck

Asa Buck

Beginner2022-02-17Added 8 answers

x2+y2xy9=0. represents an ellipse.
In the standard form, this is
(x+y)236+(xy)212=1
Let us find x=dxdy.
2xx'+2y-x'y-x=0, giving for the vertical direction
2y=x, when x=1y=1=0.
Substituting in the equation,
x2+x24x22=9, giving x=±3.
The points of contact fo the tangents are ±3(1,2).
So, the vertical tangents are x=±23.

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